Weierstrass Nullstellensatz

In mathematics, the Weierstrass Nullstellensatz is a version of the intermediate value theorem over a real closed field. It says:^[1][2]

Given a polynomial ${\displaystyle f}$ in one variable with coefficients in a real closed field F and ${\displaystyle a<b}$ in ${\displaystyle F}$, if ${\displaystyle f(a)<0<f(b)}$, then there exists a ${\displaystyle c}$ in ${\displaystyle F}$ such that ${\displaystyle a<c<b}$ and ${\displaystyle f(c)=0}$.

Since F is real-closed, F(i) is algebraically closed, hence f(x) can be written as ${\displaystyle u\prod _i(x-{\alpha }_i)}$, where ${\displaystyle u\in F}$ is the leading coefficient and ${\displaystyle {\alpha }_j\in F(i)}$ are the roots of f. Since each nonreal root ${\displaystyle {\alpha }_j=a_j+i{b}_j}$ can be paired with its conjugate ${\displaystyle {\bar{\alpha }}_j=a_j-i{b}_j}$ (which is also a root of f), we see that f can be factored in F[x] as a product of linear polynomials and polynomials of the form ${\displaystyle (x-{\alpha }_j)(x-{\bar{\alpha }}_j)=(x-a_j{)}^2+b_j^2}$, ${\displaystyle b_j\ne 0}$.

If f changes sign between a and b, one of these factors must change sign. But ${\displaystyle (x-a_j{)}^2+b_j^2}$ is strictly positive for all x in any formally real field, hence one of the linear factors ${\displaystyle x-{\alpha }_j}$, ${\displaystyle {\alpha }_j\in F}$, must change sign between a and b; i.e., the root ${\displaystyle {\alpha }_j}$ of f satisfies ${\displaystyle a<{\alpha }_j<b}$.

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